Layout to minimize gate orientation related skew effects

ABSTRACT

A method and apparatus for a driver layout is described. The layout includes an first number of gate lines arranged along a first axis and a second equal number of gates arranged along a second axis, such that the first set of gates lines is orthogonal to the second set of gates lines. The layout includes a total of N discrete transistors.

FIELD OF THE INVENTION

[0001] The present invention relates to integrated circuits, and more specifically, to integrated circuit layout design.

BACKGROUND

[0002] As the frequency of VLSI circuits increases, the need to control skew in critical circuits becomes increasingly important. Two major process related components of skew are optical astigmatism and angle of implantation. Both of these effects are sensitive to gate orientation.

[0003] Optical astigmatism can cause vertical and/or horizontal lines to be imaged onto a silicon wafer less accurately than normal. The accuracy of these critical dimensions (CDs) is fundamental but obviously some variance must be tolerated. Variance in the width and/or length of the intended transistor channel dimensions ultimately affects the strength, β, (Eq. 1.4), i.e. the current carrying capability of the device (Eqs 1.2 & 1.3). This effect is becoming ever more dominant as CDs continue to approach photolithographical limits.

[0004] The second source of transistor driving strength modulation, albeit less dominant, is a result of a variance in the angle of implantation. This causes a modulation of the device threshold voltage, V_(t), resulting in a change in the effective driving strength of the device.

[0005] In the prior art, several methods have been used to control skew. Two of these are:

[0006] use of long-channeled transistors

[0007] guaranteeing the same gate orientation of all critical circuits.

[0008] The use of long-channel transistors minimizes the effects of poly CD variance reducing the percentage change in L_(eff) (Eq. 1.6) caused by Δl. However, in order to achieve that same effective driving strength for the driver in question, the effective width, W_(eff) (Eq. 1.5) must be increased so that the β of the device is equal to that of the minimum channel device. Long-channel drivers inherently consume more die area. For example, a 20% increase in L_(eff) requires a 20% increase in W_(eff) which translates to a 20% or more increase in silicon area required.

[0009]FIG. 1A illustrates a driver circuit that may be implemented with the various circuits described below. FIG. 1B illustrates one layout of the driver of FIG. 1A having a vertical orientation with parallel transistors. FIG. 1C illustrates an alternative layout with parallel transistors having a horizontal orientation. The driver may alternatively be implemented as a single large device, as shown in FIG. 1D. The device example shown has a W/L ratio of 12. FIG. 1E shows the horizontal embodiment of the single legged device. A vertical implementation may be done in the alternative.

[0010] Guaranteeing the same gate orientation for all critical transistors is another method of controlling skew. However, maintaining the same gate orientation is not always practical. For example, I/O cells are normally placed radially to form the I/O ring of a design as shown in FIG. 2. As can be seen, the same I/O library element is placed on both the top/bottom and left/right side of a die. Thus, the same gate orientation can not be maintained.

[0011] Therefore, an improved method of controlling skew would be advantageous.

SUMMARY OF THE INVENTION

[0012] A method and apparatus for a driver layout is described. The layout includes an first number of gate lines arranged along a first axis and a second equal number of gates arranged along a second axis, such that the first set of gates lines is orthogonal to the second set of gates lines. The layout includes a total of N discrete transistors.

BRIEF DESCRIPTION OF THE DRAWINGS

[0013] The present invention is illustrated by way of example, and not by way of limitation, in the figures of the accompanying drawings and in which like reference numerals refer to similar elements and in which:

[0014]FIG. 1A is a circuit diagram of a driver circuit.

[0015] FIGS. 1B-1E are circuit diagrams and layouts of prior art transistors.

[0016]FIG. 2 is a layout of a prior art I/O ring design.

[0017] FIGS. 3A-C are one embodiment of layouts of circuits according to one embodiment of the present invention.

[0018]FIG. 4 is a layout illustrating optical astigmatism.

[0019] FIGS. 5A-8C illustrate one embodiment of step-by-step manufacturing of the driver circuit of FIG. 3.

[0020]FIG. 9 illustrates one embodiment of a diffusion plate that may be used to create the diffusion areas shown in FIG. 7A.

DETAILED DESCRIPTION

[0021] A circuit layout to minimize gate orientation related skew effects is described. This layout, for a driver with N gates, orients N/2 gates horizontally and N/2 vertically to reduce skew in integrated circuits. This is fundamentally different from selecting specific gate orientation for skew sensitive circuits on a die. For one embodiment, this driver can be referred to as a T4 driver, for tic-tac-toe Transistor layout.

[0022] The T4 driver minimizes skew by reducing the overall range of drain current, I_(ds), resulting from optical astigmatism variances. All other process parameters being equal, i.e. uE/tox constant, the skew of driver strength can be directly controlled by minimizing the range of β.

[0023] For simplicity sake, the following set of equations discussed vertical and horizontal astigmatism effects separately. If it can be shown that β_(current) is in the middle of possible values for both single and multi-legged device oriented either vertically or horizontally, then the T4 layout provides a circuit less sensitive to gate orientation skew effects. The T4 driver minimizes skew due to optical astigmatism—defined in the background section—by reducing the minimum and maximum ranges of the transistor. The discussion below, for simplicity addresses the stricture of a N-type metal oxide semiconductors (NMOS).

[0024] The basic MOS transistor equations for I_(ds), the drain to source current for a transistor, are: (1.1) I_(ds) = 0 V_(gs) ≦ V_(t) (cutoff) (1.2) $I_{ds} = {\beta*\left\lbrack {{\left( {V_{gs} - V_{t}} \right)V_{ds}} - \frac{V_{ds}^{2}}{2}} \right\rbrack}$

0 < V_(ds) <V_(gs) − V_(t) (non-saturation) (1.3) $I_{ds} = {\beta*\left\lbrack \frac{\left( {V_{gs} - V_{t}} \right)^{2}}{2} \right\rbrack}$

0 < V_(gs) − V_(t) < V_(ds) (saturation)

[0025] Where

[0026] V_(gs) is the gate to source voltage,

[0027] V_(t) is the device threshold voltage,

[0028] V_(ds) is the drain to source voltage, and

[0029] β is the transistor gain factor, such that $\begin{matrix} {{\beta = {\frac{\mu ɛ}{t_{ox}}*\left\lbrack \frac{W_{eff}}{L_{eff}} \right\rbrack}},{{where}\quad \frac{\mu ɛ}{t_{ox}}}} & \text{(1.4)} \end{matrix}$

[0030]  is the process dependent factor, where

[0031] μ is the effective surface mobility of carriers (electrons or holes),

[0032] ε is the permittivity of the gate insulator,

[0033] t_(ox) is the thickness of the gate insulator,

[0034] W_(eff) is the effective width of the channel, and

[0035] L_(eff) is the effective length of the channel

[0036] such that

[0037] (1.5) W_(eff)=W±Δw

[0038] (1.6) L_(eff)=L±Δl, where

[0039] Δw is the diffusion critical dimension variance, and

[0040] Δl is the poly critical dimension variance

[0041] Based on these equations, the transistor gain factor can be calculated for various circuit types. For one embodiment, for this calculation it can be assumed that the process dependent factor is a constant, k. Thus, for the circuits described in FIG. 1D, a single legged circuit, the value of β is $\begin{matrix} {{\beta_{1t} = {k*\left\lfloor \frac{{12\quad W} \pm {\Delta \quad w}}{L \mp \Delta} \right\rfloor}},} & (2.1) \end{matrix}$

[0042] while for the twelve parallel legged circuit shown in FIG. 1B, the value of β is $\begin{matrix} {\beta_{12t} = {k*{\left\lfloor \frac{12\quad \left( {W \pm {\Delta \quad w}} \right)}{L \mp \Delta} \right\rfloor.}}} & \text{(2.2)} \end{matrix}$

[0043] The value of β for the circuit described below in FIG. 3 is $\begin{matrix} {{\beta_{current} = {k*\left\lfloor {\frac{6\quad \left( {W \pm {\Delta \quad w}} \right)}{L \mp {\Delta \quad 1}} + \frac{6\quad \left( {W \mp {\Delta \quad w}} \right)}{L \pm {\Delta \quad 1}}} \right\rfloor}},} & \text{(2.3)} \end{matrix}$

[0044] since half of the transistors are horizontally oriented, while the other half of the transistors are vertically oriented.

[0045] Four specific examples are described below with respect to FIG. 4, illustrating two types of astigmatism, vertical and horizontal. Optical astigmatism can cause vertical and/or horizontal lines to be imaged onto a silicon wafer less accurately than normal.

[0046] Case I(a)—vertical astigmatism, along axis x and y, Δx>0, Δy=0. For this example, for simplicity, the process dependent factors are assumed to be constant and are not shown. In this case, ${\beta_{h\quad 1\quad t} = {\left\lfloor \frac{12\quad \left( {W + {\Delta \quad w}} \right)}{L + {\Delta \quad y}} \right\rfloor = \frac{12\quad \left( {W + {\Delta \quad x}} \right)}{L}}},{\beta_{v\quad 1t} = {\left\lfloor \frac{12\quad \left( {W + {\Delta \quad y}} \right)}{L + {\Delta \quad x}} \right\rfloor = \frac{12\quad W}{L + {\Delta \quad x}}}}$ ${\beta_{h\quad 12\quad t} = {\left\lfloor \frac{12\quad \left( {W + {\Delta \quad x}} \right)}{L + {\Delta \quad y}} \right\rfloor = \frac{{12\quad W} + {12\Delta \quad x}}{L}}},{\beta_{v\quad 12t} = {\left\lfloor \frac{12\quad \left( {W + {\Delta \quad y}} \right)}{L + {\Delta \quad x}} \right\rfloor = \frac{12\quad W}{L + {\Delta \quad x}}}}$ ${\beta_{current} = {\left\lfloor {\frac{6\quad \left( {W + {\Delta \quad x}} \right)}{L + {\Delta \quad y}} + \frac{6\quad \left( {W + {\Delta \quad y}} \right)}{L + {\Delta \quad x}}} \right\rfloor = \left\lfloor {\frac{\left( {{6\quad W} + {6\Delta \quad x}} \right)}{L} + \frac{6\quad W}{L + {\Delta \quad x}}} \right\rfloor}},$

[0047] thus,

[0048] β_(v12t)=β_(v1t)<β_(current)<β_(h1t)<β_(h12t), similarly, it can be proven that for Case I(b), where Δx<0, Δy=0,

[0049] β_(h12t)<β_(h1t)<β_(current)<β_(v1t)=β_(v12t). Thus it appears that β_(current), having an equal number of transistors oriented horizontally and vertically is less sensitive to vertical astigmatism than either of the two prior art methods.

[0050] Similarly, for Case II(a), horizontal astigmatism, where Δx=0, Δy>0, ${\beta_{h\quad 1\quad t} = {\left\lfloor \frac{{12\quad W} + {\Delta \quad x}}{L + {\Delta \quad y}} \right\rfloor = \frac{12\quad W}{L + {\Delta \quad y}}}},{\beta_{v\quad 1t} = {\left\lfloor \frac{{12\quad W} + {\Delta \quad y}}{L + {\Delta \quad x}} \right\rfloor = \frac{{12\quad W} + {\Delta \quad y}}{L}}}$ ${\beta_{h\quad 12\quad t} = {\left\lfloor \frac{12\quad \left( {W + {\Delta \quad x}} \right)}{L + {\Delta \quad y}} \right\rfloor = \frac{12\quad W}{L + {\Delta \quad y}}}},{\beta_{v\quad 12t} = {\left\lfloor \frac{12\quad \left( {W + {\Delta \quad y}} \right)}{L + {\Delta \quad x}} \right\rfloor = \frac{{12\quad W} + {12\left( {\Delta \quad y} \right)}}{L}}}$ ${\beta_{current} = {\left\lfloor {\frac{6\quad \left( {W + {\Delta \quad x}} \right)}{L + {\Delta \quad y}} + \frac{6\quad \left( {W + {\Delta \quad y}} \right)}{L + {\Delta \quad x}}} \right\rfloor = \left\lfloor {\frac{6\quad W}{L + {\Delta \quad y}} + \frac{\left( {{6\quad W} + {6\left( {\Delta \quad y} \right)}} \right)}{L}} \right\rfloor}},$

[0051] thus,

[0052] β_(h12t)=β_(h1t)<β_(current)<β_(v1t)<β_(v12t), similarly, it can be proven that for Case II(b), where Δx=0, Δy<0,

[0053] β_(v12t)<β_(v1t)<β_(current)<β_(h1t)=β_(h12t). Thus it appears that β_(current), having an equal number of transistors oriented horizontally and vertically is less sensitive to horizontal astigmatism than either of the two prior art methods.

[0054] Astigmatism may have both horizontal and vertical aspects. Since β_(current) is less sensitive to horizontal astigmatism, and β_(current) is less sensitive to vertical astigmatism, therefore β_(current) is less sensitive to a combined horizontal and vertical astigmatism.

[0055] For one embodiment, this structure, which is a fundamental building block, can be stepped and repeat in both X and Y directions to create stronger drivers. The basic twelve transistor structure shown in FIG. 3A below can be permutated by removing an even number of transistor legs to create other structures. For example T9-T12 may be removed to create an O-ring device, as shown in FIG. 3B. A single pair of legs may also be used to generate four transistors, as shown in FIG. 3C. Any even number of transistors may be set in this structure, such that half of the transistors are orthogonal to the other half of the transistors. By using such a layout of transistors, skew effects are minimized.

[0056] Common library elements which can not be placed to guarantee the same orientation for a specific gate, e.g. I/O cells for bond-wire designs, can use this layout method to eliminate gate orientation skew.

[0057] The T4 driver can also reduce the modulations in threshold voltage, Vt, resulting from implant angle variations which can arise between orthogonally oriented transistors. It can be seen in both the saturated and non-saturated current equations, that variations in Vt will cause variations in driver current. These Vt variations also skew the behavior of the driver and minimizing these is beneficial to controlling overall circuit skew. Keeping the gate orientation of N/2 transistors orthogonal to the other half of transistors, forces all T4 driver configuration to experience that same set of variations. In much the same way as with optical astigmatism, this minimizes the magnitude of Vt variance.

[0058]FIG. 3A illustrates an exemplary layout of a T4 driver. The driver includes twelve transistors T1 to T12 390 arranged symmetrically along four legs 310-325. The legs 310-325 are arranged in a bilaterally symmetric format. The legs 310-325 form the gates of transistors Ti 340 to T12 395. For one embodiment, the legs 310-325 are polysilicon. Alternatively, the legs 310-325 may be metal, or another conductive material. The legs 310-325 are placed on a substrate (not shown). The substrate includes source 330 and drain sections 340 , in an alternating pattern. Thus, for example, all corners and the center section may be source sections 330 , while the other sections are drain sections 340. Around each crossing of the legs 310-320 is a non-diffused area 350. The interconnections between the sources are not shown. For one embodiment, the sources may be tied together and the drains may be tied together, using metal layers.

[0059] Thus, for example, one transistor, T1 360, is circled, including a portion of leg 310 and adjacent source 330 and drain 340 areas. Transistor T1 360 shares a source with transistor T8, and a drain with transistor T2. The gate area of the transistor T1 360 is defined by the edge of the structure and the non-diffused area 350. FIGS. 3B and 3C illustrate permutations of this design, with fewer numbers of transistors. Similarly, additional transistors may be added to the system, while balancing the number of transistors

[0060]FIG. 4 is a layout illustrating optical astigmatism. For simplicity, the system is described as being horizontally oriented, such that the diffusion area extends horizontally. The first figure shows a vertical astigmatism, where Δy>0, and Δx=0. The second figure shows horizontal astigmatism, where Δx>0, and Δy=0. Of course, astigmatism may involve both an x and a y component, but this is not shown in FIG. 4.

[0061] FIGS. 5A-C illustrate top, side, and perspective views of the substrate on which a transistor layout according to the present invention may be implemented. For one embodiment, the substrate is a silicon substrate. Alternatively, ceramics, sapphire, or other materials may be used for the substrate.

[0062] FIGS. 6A-C illustrate top, side, and perspective views of the substrate after a first layer of a conductor 510 has been deposited. This conductor 510 forms the gate for the transistor. For one embodiment, the stage shown at FIGS. 6A-C is achieved by a two step process, initially depositing a layer of conductor 510, and then etching away the material 510. For one embodiment, a layer of silicon dioxide (SiO2 ) 515 is deposited on the substrate prior to the conductor 510 deposition. For another embodiment, another material may be used in place of the silicon dioxide. This SiO2 layer 515 is removed with the conductive layer 510, leaving a layer of SiO2 layer 515 underneath the conductor layer 510. For one embodiment, the conductor 510 is a metal layer. For another embodiment, the conductor 510 is a polysilicon, layer. Alternative materials may be used.

[0063] FIGS. 7A-C illustrate top, side, and perspective views of the substrate after a diffusion step. The diffusion step creates the source and drain regions 520. For one embodiment, the step further dopes the gate 510. The diffusion step creates non-diffused areas 525, centered around the intersection of gates 510. FIG. 9 illustrates a diffusion plate 910 that may be used to create the diffusion areas shown in FIG. 7C. With this step a complete transistor is formed, with the gate area 515 surrounded on either side by a source 530 and drain 540 contact.

[0064] FIGS. 8A-C illustrate top, side, and perspective views of the substrate after contact windows are established. The contact windows 530,540 permit the transistor to be hooked up to other devices. This figure does not show the interconnections between the source and drain contacts. of each transistor. However, by interconnecting the source and drain areas appropriately, various circuits may be created.

[0065] In this way, a symmetric set of drivers is manufactured, with transistors in both directions.

[0066] In the foregoing specification, the invention has been described with reference to specific exemplary embodiments thereof. It will, however, be evident that various modifications and changes may be made thereto without departing from the broader spirit and scope of the invention as set forth in the appended claims. The specification and drawings are, accordingly, to be regarded in an illustrative rather than a restrictive sense. 

What is claimed is:
 1. A layout comprising for an even number of discrete transistors, N, comprising: a first half of the transistors (N/2) oriented along a first axis, a second half of the transistors (N/2) oriented along a second axis orthogonal to the first half of the transistors.
 2. The layout of claim 1, wherein the transistor layout is bilaterally symmetric along both the X and Y axis.
 3. The layout of claim 1, comprising: a plurality of legs arranged in a bilaterally symmetric format, the legs forming the gates of the N transistors.
 4. The layout of claim 3, further comprising: diffused areas forming sources and drains; and an area at which any of the plurality of legs cross, the area being a non-diffused area.
 5. The layout of claim 3, wherein the plurality of legs form a tic-tac-toe pattern.
 6. The layout of claim 5, wherein the tic-tac-toe pattern defines square areas between the legs; and the source and drain areas alternate in the square areas.
 7. The layout of claim 5, wherein the tic-tac-toe pattern may be repeated to form a larger layout.
 8. The layout of claim 1, used for an integrated circuit, wherein the gate orientation reduces skew effects due to mask alignment and gate orientation.
 9. A symmetric transistor layout comprising: an even number of transistor legs, laid out in an intersecting pattern, forming a bilaterally symmetric base; a plurality of source areas and drain areas defined by rectangles enclosed by two or more transistor legs; and undiffused areas defined by an intersection of the legs; a plurality of transistors defined by a portion of a leg forming a gate and the source and drain areas on either side of the leg forming a source and a drain.
 10. The symmetric transistor layout of claim 9, wherein the plurality of transistors is an even number of transistors.
 11. The symmetric transistor layout of claim 10, wherein a first half of the transistors are horizontally oriented and a second half of the transistors are vertically oriented.
 12. The symmetric transistor layout of claim 9, wherein the plurality of legs form a tic-tac-toe pattern.
 13. A method of making a symmetric transistor device comprising: depositing a first conductive layer on a substrate, the first conductive layer forming an even number of transistor legs, laid out in an intersecting pattern, forming a bilaterally symmetric base; doping the substrate to form source and drain regions; and forming a plurality of transistors defined by a portion of a leg forming a gate and the source and drain areas on either side of the leg forming a source and a drain.
 14. The method of claim 13, further comprising: depositing a silicon dioxide prior to depositing the first conductive layer.
 15. The method of claim 13, wherein a diffusion plate used for doping forms undoped areas at intersections of the transistor legs.
 16. The method of claim 13, wherein the intersecting pattern forms a tic-tac-toe pattern.
 17. The method of claim 13, wherein the first conductive layer comprises polysilicon.
 18. The method of claim 13, further comprising: conductive interconnections between the source and drain areas to form a circuit.
 19. The method of claim 13, wherein a first half of the transistors are oriented along a first axis and a second half of the transistors (N/2) oriented along a second axis orthogonal to the first half of the transistors.
 20. The method of claim 19, wherein the minimum drawn W/L is used for each transistor leg. 